I'm aware that this is a rather general question, but I only need some hint to literature.
The setup. I'm studying the existence and regularity of weak solutions to linear elliptic pde of the form $$ \begin{cases} Lu=f & \text{in } U \\ u=g & \text{on } \partial U \end{cases} $$ Here $U \subset \mathbb{R}^N$ is open and bounded; $f : U \to \mathbb{R}$ is given; $L$ denotes a second-order elliptic operator and $u: \overline{U} \to \mathbb{R}$ is the unknown.
The problem. All books I read (Gilbarg+Trudinger, Evans, Taylor, Giaquinta) deal with real functions $u$. But there are a lot of equations (e.g. the Gross-Pitaevskii equation) that allow for complex valued solutions.
Why does none of the authors deal with solutions of complex range (i.e. with linear systems of pde)? None of them even mention such equations (except in the quasi-linear case).
Is that because the generalization to linear systems is trivial? Is it because it is too hard? Can someone point me to some literature that deals with this kind of stuff?